4 to 10,2 to
For question 1 the answer is the small table because you have to divide the number of tables by the number of pizzas. For answer 2 the answer is no becuse he was scaling down and simplfying the ratios to 9 and 5. The rest I do not know so good luck.
Two ratios that have the same value are called "proportional ratios" or simply "proportions." When two ratios are equal, they can be expressed in the form ( \frac{a}{b} = \frac{c}{d} ), indicating that the relationship between the quantities remains consistent. This concept is fundamental in mathematics, especially in solving problems involving similar figures, scaling, and comparing quantities.
proportion
You can use ratios of adjacent sides to prove if two rectangles are similar by comparing to see if the ratios are the same
Scaling or using equivalent ratios can help in decision-making by allowing for comparisons between different quantities or situations in a standardized way. For instance, if you need to choose between two different products based on price and quality, you can create a ratio of price to quality for each product. By scaling these ratios, you can easily identify which product offers better value for money. This method ensures that decisions are based on objective data rather than subjective opinions.
For question 1 the answer is the small table because you have to divide the number of tables by the number of pizzas. For answer 2 the answer is no becuse he was scaling down and simplfying the ratios to 9 and 5. The rest I do not know so good luck.
Scaling- when you multiply or divide equivalent fractions
To use ratio tables for comparing ratios, first, create a table that lists the values of each ratio in corresponding rows. For example, if you're comparing the ratios of apples to oranges and bananas to grapes, list the quantities of each in separate columns. By filling in the table with equivalent values (e.g., scaling each ratio to a common denominator), you can easily see which ratio is greater or if they are equivalent. This visual representation helps clarify the relationships between the ratios at a glance.
proportion
cross product.
You can use ratios of adjacent sides to prove if two rectangles are similar by comparing to see if the ratios are the same
Scaling or using equivalent ratios can help in decision-making by allowing for comparisons between different quantities or situations in a standardized way. For instance, if you need to choose between two different products based on price and quality, you can create a ratio of price to quality for each product. By scaling these ratios, you can easily identify which product offers better value for money. This method ensures that decisions are based on objective data rather than subjective opinions.
give the meaning and answer of kinds of fraction percent ratio proportion decimals inverse comparing ratios converting rartios rate
Proportions work because they show the relationship between different quantities by comparing them using fractions or ratios. They are useful for scaling up or down values while maintaining their relative sizes. This makes proportions a powerful tool for solving a wide range of problems in mathematics and real-life situations.
To find proportions in math, you can set up a proportion as an equation that states two ratios are equal. For example, if you have two ratios (a/b = c/d), you can cross-multiply to solve for an unknown: (a \cdot d = b \cdot c). You can also find proportions by dividing one quantity by another to determine their relationship, often expressed as a fraction or percentage. This is useful in various applications, such as scaling recipes or comparing quantities.
Ratios are useful for comparing amounts or quantities because they provide a simplified way to express the relationship between two values. By dividing one value by another, ratios can help determine the relative size or proportion of different entities or quantities.
Proportions are useful in the real world for scaling, estimating, and comparing quantities. They allow us to make predictions and solve problems involving ratios of different amounts. For example, proportions are used in cooking recipes to scale ingredients, in finance to calculate interest rates, and in design to maintain balance and harmony.